The group elements are generated by (g, 1, 1, ...), (1, g, 1, ... ), (1, 1, g, ...) ...
that is have a form (g^i1, g^i2, ... )
where g^p = 1 for some p.
There is an edge between elements in the group where elements at some index have powers of g different by 1 modulo p, that is g^1 and g^2 have a bidirectional edge for p = 4, but g^1 and g^3 do not.
Does there always exist a Hamiltonian cycle in such a group? What kind of structure does it have?
Example
For g = 1 under addition modulo 2 (0, 0, ... 1, 0, 0, 0)
generate vertices of a hypercube. So the question is if there is a Hamiltonian cycle in the hypercube.